Respuesta :
[tex]\bf \begin{array}{ccllll}
radians&d e grees\\
\text{\textemdash\textemdash\textemdash}&\text{\textemdash\textemdash\textemdash}\\
\pi &180\\
\frac{\pi }{3}&d
\end{array}\implies \cfrac{\pi }{\frac{\pi }{3}}=\cfrac{180}{d}\implies \cfrac{\frac{\pi }{1}}{\frac{\pi }{3}}=\cfrac{180}{d}
\\\\\\
\cfrac{\pi }{1}\cdot \cfrac{3}{\pi }=\cfrac{180}{d}\implies 3=\cfrac{180}{d}\implies d=\cfrac{180}{3}[/tex]
and pretty sure you know how much that is.
and pretty sure you know how much that is.
Answer: The equivalent expression in degrees is 60°.
Step-by-step explanation: We are given to find the equivalent of the following expression in degrees.
[tex]E=\dfrac{\pi}{3}~\textup{radians}.[/tex]
We will be using the UNITARY method the solve the given problem.
We know that
[tex]\pi~\textup{radians}=180^\circ\\\\\\\Rightarrow 1~\textup{radian}=\left(\dfrac{180}{\pi}\right)^\circ\\\\\\\Rightarrow \dfrac{\pi}{3}~\textup{radians}=\left(\dfrac{\pi}{3}\times\dfrac{180}{\pi}\right)^\circ=60^\circ.[/tex]
Thus, the equivalent expression in degrees is 60°.
